Question for linear algebra ----diagonalization If a nxn matrix A is diagonalizable, will their power matrix...

I'm studying Linear Algebra. A Matrix A is a 3*3 matrix and it has 3 linear...

I'm studying Linear Algebra. A Matrix A is a 3*3 matrix and it has 3 linear independent eigenvectors. The Matrix B has the same eigenvectors (but not necessarily the same eigenvalues). I'm supposed to prove that AB=BA. I'm given a clue that says: ,, Is it possible to diagonal A and B?''. I want to be clear that the matrixes are not given. Thank you.

(Linear Algebra) A n×n-matrix is nilpotent if there is a "r" such that Ar is the...

(Linear Algebra) A n×n-matrix is nilpotent if there is a "r" such that Ar is the nulmatrix. 1. show an example of a non-trivial, nilpotent 2×2-matrix 2.let A be an invertible n×n-matrix. show that A is not nilpotent.

linear algebra Chapter based on invertible matrix. For square matrix A, A is invertible if and...

linear algebra Chapter based on invertible matrix. For square matrix A, A is invertible if and only if AT is invertible. Is this statement true/ false. please justify? thank you

Linear Algebra question: Prove that if A:X→Y and V is a subspace of X then dim...

Linear Algebra question: Prove that if A:X→Y and V is a subspace of X then dim AV ≤ dim V. Deduce from here that rank(AB) ≤ rank B

Linear Algebra Project : Dominant Eigenvalue Computation a. Apply the Power Method to estimate the dominant...

Linear Algebra Project : Dominant Eigenvalue Computation a. Apply the Power Method to estimate the dominant eigenvalue and a corresponding eigenvector for the matrix A and initial vector x0 below. Stop at k = 5. You can use 5 decimal places maximum if you wish (using rounding). A = 8 0 12 1 −2 1 0 3 0 ; x0 = 1 0 0 (You can also choose any other 3 × 3 or 4 × 4 matrix instead of...

Linear Algebra College Level: Create a matrix with nullspace generated by <1,1,0> and <0,0,1>. Explain.

Linear Algebra College Level: Create a matrix with nullspace generated by <1,1,0> and <0,0,1>. Explain.

Linear algebra Find a transformation matrix A for P^2 -> P^3 then show its onto

Linear algebra Find a transformation matrix A for P^2 -> P^3 then show its onto

Please explain what the identity matrix is. The course is linear algebra. The book describes it...

Please explain what the identity matrix is. The course is linear algebra. The book describes it simply as a matrix with 1's on the diagonal and 0's elsewhere. Why is that? Can you explain it for a first time learner of this material? Thank you! I appreciate it!

Linear Algebra Find the 2x2 matrix A of a linear transformation T: R^2->R^2 such that T(vi)...

Linear Algebra Find the 2x2 matrix A of a linear transformation T: R^2->R^2 such that T(vi) = wi for i = 1,2. v1=(4,3), v2=(5,4); w1=(-3,2), w2=(-3,-4)

Prove that for a square n ×n matrix A, Ax = b (1) has one and...

Prove that for a square n ×n matrix A, Ax = b (1) has one and only one solution if and only if A is invertible; i.e., that there exists a matrix n ×n matrix B such that AB = I = B A. NOTE 01: The statement or theorem is of the form P iff Q, where P is the statement “Equation (1) has a unique solution” and Q is the statement “The matrix A is invertible”. This means...